A new computational method based on the minimum lithostatic deviation (MLD) principle to analyse slope stability in the frame of the 2-D limit-equilibrium theory

Tinti, S.; Manucci, A.

doi:https://doi.org/10.5194/nhess-8-671-2008

Articles | Volume 8, issue 4

https://doi.org/10.5194/nhess-8-671-2008

© Author(s) 2008. This work is distributed under
the Creative Commons Attribution 3.0 License.

https://doi.org/10.5194/nhess-8-671-2008

© Author(s) 2008. This work is distributed under
the Creative Commons Attribution 3.0 License.

Articles | Volume 8, issue 4

16 Jul 2008

| 16 Jul 2008

A new computational method based on the minimum lithostatic deviation (MLD) principle to analyse slope stability in the frame of the 2-D limit-equilibrium theory

S. Tinti and A. Manucci

Viewed

Total article views: 1,748 (including HTML, PDF, and XML)

HTML	PDF	XML	Total	BibTeX	EndNote
758	809	181	1,748	106	94

HTML: 758
PDF: 809
XML: 181
Total: 1,748
BibTeX: 106
EndNote: 94

Views and downloads (calculated since 01 Feb 2013)

Month	HTML	PDF	XML	Total
Feb 2013	4	7	0	11
Mar 2013	1	7	0	8
Apr 2013	3	8	1	12
May 2013	2	8	0	10
Jun 2013	1	8	0	9
Jul 2013	2	15	0	17
Aug 2013	10	5	0	15
Sep 2013	1	8	1	10
Oct 2013	5	8	0	13
Nov 2013	1	8	4	13
Dec 2013	4	4	1	9
Jan 2014	2	10	2	14
Feb 2014	4	11	3	18
Mar 2014	10	8	3	21
Apr 2014	1	10	0	11
May 2014	5	8	0	13
Jun 2014	3	9	1	13
Jul 2014	1	8	0	9
Aug 2014	4	10	1	15
Sep 2014	3	8	1	12
Oct 2014	1	9	0	10
Nov 2014	3	15	0	18
Dec 2014	3	10	1	14
Jan 2015	1	7	0	8
Feb 2015	4	4	0	8
Mar 2015	5	4	0	9
Apr 2015	2	2	0	4
May 2015	2	1	0	3
Jun 2015	21	2	0	23
Jul 2015	13	0	13
Aug 2015	7	7	0	14
Sep 2015	1	3	0	4
Oct 2015	8	1	0	9
Nov 2015	9	5	0	14
Dec 2015	3	4	1	8
Jan 2016	13	6	1	20
Feb 2016	7	7	0	14
Mar 2016	9	3	0	12
Apr 2016	8	2	0	10
May 2016	4	2	0	6
Jun 2016	5	1	0	6
Jul 2016	4	1	5
Aug 2016	3	4	0	7
Sep 2016	4	2	0	6
Oct 2016	3	2	1	6
Nov 2016	5	2	0	7
Dec 2016	5	6	0	11
Jan 2017	6	0	6
Feb 2017	5	1	0	6
Mar 2017	8	1	0	9
Apr 2017	7	6	0	13
May 2017	11	2	0	13
Jun 2017	9	2	0	11
Jul 2017	9	4	0	13
Aug 2017	4	5	0	9
Sep 2017	5	8	0	13
Oct 2017	4	10	1	15
Nov 2017	5	11	2	18
Dec 2017	7	12	3	22
Jan 2018	3	14	3	20
Feb 2018	1	8	2	11
Mar 2018	9	11	4	24
Apr 2018	4	12	3	19
May 2018	4	11	2	17
Jun 2018	6	16	4	26
Jul 2018	5	9	3	17
Aug 2018	14	18	8	40
Sep 2018	9	13	2	24
Oct 2018	3	11	2	16
Nov 2018	7	9	4	20
Dec 2018	8	11	4	23
Jan 2019	4	7	4	15
Feb 2019	4	1	4	9
Mar 2019	5	8	4	17
Apr 2019	3	10	2	15
May 2019	6	8	5	19
Jun 2019	3	13	2	18
Jul 2019	3	12	4	19
Aug 2019	1	8	4	13
Sep 2019	10	6	16
Oct 2019	10	2	12
Nov 2019	2	10	2	14
Dec 2019	3	9	1	13
Jan 2020	3	7	3	13
Feb 2020	1	2	3	6
Mar 2020	1	4	3	8
Apr 2020	2	1	2	5
May 2020	2	1	3
Jun 2020	8	2	0	10
Jul 2020	20	14	10	44
Aug 2020	3	7	5	15
Sep 2020	10	5	0	15
Oct 2020	4	4	1	9
Nov 2020	6	10	2	18
Dec 2020	3	7	0	10
Jan 2021	17	1	0	18
Feb 2021	2	3	0	5
Mar 2021	15	2	0	17
Apr 2021	3	0	3
May 2021	2	3	0	5
Jun 2021	2	6	0	8
Jul 2021	4	2	0	6
Aug 2021	3	1	0	4
Sep 2021	7	4	0	11
Oct 2021	2	14	0	16
Nov 2021	6	7	0	13
Dec 2021	2	1	1	4
Jan 2022	7	4	0	11
Feb 2022	3	2	1	6
Mar 2022	4	3	1	8
Apr 2022	6	4	2	12
May 2022	5	2	1	8
Jun 2022	4	1	5
Jul 2022	1	0	1
Aug 2022	4	2	0	6
Sep 2022	3	1	0	4
Oct 2022	4	2	1	7
Nov 2022	10	3	0	13
Dec 2022	3	3	0	6
Jan 2023	5	6	0	11
Feb 2023	6	4	0	10
Mar 2023	6	4	2	12
Apr 2023	0
May 2023	3	3	3	9
Jun 2023	2	3	0	5
Jul 2023	2	2	0	4
Aug 2023	3	3	2	8
Sep 2023	2	3	0	5
Oct 2023	7	5	1	13
Nov 2023	3	1	4
Dec 2023	7	1	2	10
Jan 2024	7	3	1	11
Feb 2024	3	2	2	7
Mar 2024	6	4	2	12
Apr 2024	10	2	1	13
May 2024	7	5	4	16
Jun 2024	6	2	1	9
Jul 2024	14	7	3	24
Aug 2024	12	4	3	19
Sep 2024	6	1	7
Oct 2024	8	1	0	9
Nov 2024	5	1	0	6
Dec 2024	3	0	3
Jan 2025	8	7	0	15
Feb 2025	9	3	0	12
Mar 2025	10	3	1	14
Apr 2025	6	1	0	7
May 2025	8	2	3	13

Cumulative views and downloads (calculated since 01 Feb 2013)

Month	HTML	PDF	XML	Total
Feb 2013	4	7	0	11
Mar 2013	1	7	0	8
Apr 2013	3	8	1	12
May 2013	2	8	0	10
Jun 2013	1	8	0	9
Jul 2013	2	15	0	17
Aug 2013	10	5	0	15
Sep 2013	1	8	1	10
Oct 2013	5	8	0	13
Nov 2013	1	8	4	13
Dec 2013	4	4	1	9
Jan 2014	2	10	2	14
Feb 2014	4	11	3	18
Mar 2014	10	8	3	21
Apr 2014	1	10	0	11
May 2014	5	8	0	13
Jun 2014	3	9	1	13
Jul 2014	1	8	0	9
Aug 2014	4	10	1	15
Sep 2014	3	8	1	12
Oct 2014	1	9	0	10
Nov 2014	3	15	0	18
Dec 2014	3	10	1	14
Jan 2015	1	7	0	8
Feb 2015	4	4	0	8
Mar 2015	5	4	0	9
Apr 2015	2	2	0	4
May 2015	2	1	0	3
Jun 2015	21	2	0	23
Jul 2015	13	0	13
Aug 2015	7	7	0	14
Sep 2015	1	3	0	4
Oct 2015	8	1	0	9
Nov 2015	9	5	0	14
Dec 2015	3	4	1	8
Jan 2016	13	6	1	20
Feb 2016	7	7	0	14
Mar 2016	9	3	0	12
Apr 2016	8	2	0	10
May 2016	4	2	0	6
Jun 2016	5	1	0	6
Jul 2016	4	1	5
Aug 2016	3	4	0	7
Sep 2016	4	2	0	6
Oct 2016	3	2	1	6
Nov 2016	5	2	0	7
Dec 2016	5	6	0	11
Jan 2017	6	0	6
Feb 2017	5	1	0	6
Mar 2017	8	1	0	9
Apr 2017	7	6	0	13
May 2017	11	2	0	13
Jun 2017	9	2	0	11
Jul 2017	9	4	0	13
Aug 2017	4	5	0	9
Sep 2017	5	8	0	13
Oct 2017	4	10	1	15
Nov 2017	5	11	2	18
Dec 2017	7	12	3	22
Jan 2018	3	14	3	20
Feb 2018	1	8	2	11
Mar 2018	9	11	4	24
Apr 2018	4	12	3	19
May 2018	4	11	2	17
Jun 2018	6	16	4	26
Jul 2018	5	9	3	17
Aug 2018	14	18	8	40
Sep 2018	9	13	2	24
Oct 2018	3	11	2	16
Nov 2018	7	9	4	20
Dec 2018	8	11	4	23
Jan 2019	4	7	4	15
Feb 2019	4	1	4	9
Mar 2019	5	8	4	17
Apr 2019	3	10	2	15
May 2019	6	8	5	19
Jun 2019	3	13	2	18
Jul 2019	3	12	4	19
Aug 2019	1	8	4	13
Sep 2019	10	6	16
Oct 2019	10	2	12
Nov 2019	2	10	2	14
Dec 2019	3	9	1	13
Jan 2020	3	7	3	13
Feb 2020	1	2	3	6
Mar 2020	1	4	3	8
Apr 2020	2	1	2	5
May 2020	2	1	3
Jun 2020	8	2	0	10
Jul 2020	20	14	10	44
Aug 2020	3	7	5	15
Sep 2020	10	5	0	15
Oct 2020	4	4	1	9
Nov 2020	6	10	2	18
Dec 2020	3	7	0	10
Jan 2021	17	1	0	18
Feb 2021	2	3	0	5
Mar 2021	15	2	0	17
Apr 2021	3	0	3
May 2021	2	3	0	5
Jun 2021	2	6	0	8
Jul 2021	4	2	0	6
Aug 2021	3	1	0	4
Sep 2021	7	4	0	11
Oct 2021	2	14	0	16
Nov 2021	6	7	0	13
Dec 2021	2	1	1	4
Jan 2022	7	4	0	11
Feb 2022	3	2	1	6
Mar 2022	4	3	1	8
Apr 2022	6	4	2	12
May 2022	5	2	1	8
Jun 2022	4	1	5
Jul 2022	1	0	1
Aug 2022	4	2	0	6
Sep 2022	3	1	0	4
Oct 2022	4	2	1	7
Nov 2022	10	3	0	13
Dec 2022	3	3	0	6
Jan 2023	5	6	0	11
Feb 2023	6	4	0	10
Mar 2023	6	4	2	12
Apr 2023	0
May 2023	3	3	3	9
Jun 2023	2	3	0	5
Jul 2023	2	2	0	4
Aug 2023	3	3	2	8
Sep 2023	2	3	0	5
Oct 2023	7	5	1	13
Nov 2023	3	1	4
Dec 2023	7	1	2	10
Jan 2024	7	3	1	11
Feb 2024	3	2	2	7
Mar 2024	6	4	2	12
Apr 2024	10	2	1	13
May 2024	7	5	4	16
Jun 2024	6	2	1	9
Jul 2024	14	7	3	24
Aug 2024	12	4	3	19
Sep 2024	6	1	7
Oct 2024	8	1	0	9
Nov 2024	5	1	0	6
Dec 2024	3	0	3
Jan 2025	8	7	0	15
Feb 2025	9	3	0	12
Mar 2025	10	3	1	14
Apr 2025	6	1	0	7
May 2025	8	2	3	13

Cited

Latest update: 31 May 2025

A new computational method based on the minimum lithostatic deviation (MLD) principle to analyse slope stability in the frame of the 2-D limit-equilibrium theory

Viewed

Cited

5 citations as recorded by crossref.